4 



$. 3,3. ■• HiC manent nt ante ^ n )/ ( 4 s + 4 z 5 ) ; 

 g — 1 +6z?. + j 4 ; at crit F ~~ 1 ct G^z, ideoque for 

 mulu fpecialis 



(i + czz + z 4 )|/(.z + 4 zy 



liocque cafu ciit 



t — i/-+-g' fqjdji .4. (/ — g' r p aj 



7 2 • J I-f-<^ 2 J I ■ £4 ' 



cxiftentv 



1+2 

 P = ■ ct q 



i (+ Z ■+■ 4 S 5 ) >/ (.4- Z ■+- 4 Z ? J 



7. Sit n = 5 ct »2 = ij klcoquc /2 — m = 4. 



5 

 J. 34. Hic igitur erit z; z= /'(? z -4- 10 z 5 -f- z*)- 



^=i + iozz+^z 4 ; Fz=r + 6z2 + z' et G ~ 4 z ■+• 4 z 3 • 

 cx quibus oritur formula fpecialis 



£ = f ^^ + ^2 + 2^4 g ( z -j- z;) ] 



(l + IOZ2+5Z 4 )|/( 5 z+ 10 Z 3 + ^) 



cuius valor hoc cafu erit 



% = — (/-+■?) jf _^_ -4- t/ — gl T dP 



2 •/l + gs~ 2 / l — ps 9 



exiftente 



V=— i-_ et cj = r 



Y (s z -+- 10 z 3 ■+. z y ) )/ (5 Z -+- icz 3 + z') 



8. 



